Krylov Subspace Methods Principles and Analysis
Krylov Subspace Methods Principles and Analysis by Jörg Liesen, published by OUP Oxford in 2013, offers a comprehensive examination of the mathematical theory behind Krylov subspace methods, particularly in the context of solving systems of linear algebraic equations. This illustrated edition spans 391 pages and is presented in English, providing a detailed treatment that begins with the concept of projections and explores the orthogonality and minimization properties of these methods.
Readers will find an in-depth discussion on the connection between projections onto nonlinear Krylov subspaces and the problem of moments, framing Krylov subspace methods within the context of model reduction. The book delves into the generation of orthogonal Krylov subspace bases and distinguishes between Hermitian and non-Hermitian problems, while also addressing the computational costs associated with these methods. It emphasizes the interplay between algebraic computations and real-world problem-solving, highlighting the significance of historical context in understanding contemporary computational challenges. Extensive historical notes and discussions on unresolved issues are integrated throughout the text, making this work suitable for graduate courses and those interested in the history of mathematics.
Official synopsis Publisher
The mathematical theory of Krylov subspace methods with a focus on solving systems of linear algebraic equations is given a detailed treatment in this principles-based book. Starting from the idea of projections, Krylov subspace methods are characterised by their orthogonality and minimisation properties. Projections onto highly nonlinear Krylov subspaces can be linked with the underlying problem of moments, and therefore Krylov subspace methods can be viewed as matching moments model reduction. This allows enlightening reformulations of questions from matrix computations into the language of orthogonal polynomials, Gauss-Christoffel quadrature, continued fractions, and, more generally, of Vorobyev’s method of moments. Using the concept of cyclic invariant subspaces, conditions are studied that allow the generation of orthogonal Krylov subspace bases via short recurrences. The results motivate the important practical distinction between Hermitian and non-Hermitian problems. Finally, the book thoroughly addresses the computational cost while using Krylov subspace methods. The investigation includes effects of finite precision arithmetic and focuses on the method of conjugate gradients (CG) and generalised minimal residuals (GMRES) as major examples. There is an emphasis on the way algebraic computations must always be considered in the context of solving real-world problems, where the mathematical modelling, discretisation and computation cannot be separated from each other. The book also underlines the importance of the historical context and demonstrates that knowledge of early developments can play an important role in understanding and resolving very recent computational problems. Many extensive historical notes are included as an inherent part of the text as well as the formulation of some omitted issues and challenges which need to be addressed in future work. This book is applicable to a wide variety of graduate courses on Krylov subspace methods and related subjects, as well as benefiting those interested in the history of mathematics.
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